2 2. Not all linear systems have solutions For example 3x 1 + 3x 2 = 9 3x 1 + 3x 2 = 3 does not have a solution, the 2 equations contradict each other. 3. Other linear systems have infinite many solutions 3x 1 + 3x 2 = 9 x 1 + x 2 = 3 For all t R x 1 = t and x 2 = 3 t are solutions of the linear system. Check: 3t + 3(3 t) = 3t + 9 3t = 9 t + (3 t) = t + 3 t = 3 To find just one solution, e.g. choose x 1 = t = 3, x 2 = 3 t = 3 3 = 0, then this is one solution of the linear system. Geometrically in 2 dimensions: We will later prove that for every linear system exactly one of three possibilities hold 1. has no solution 2. has exactly one solution, or 3. has infinitely many solutions Definition 3 A linear system that has no solution is called inconsistent A linear system with at least one solution is called consistent. 2

3 In order to abbreviate the writing (mathematicians are lazy, when it comes to writing) matrices are used to represent linear systems. Example 3 The following linear system 3x 1 + 2x 2 3x 3 = 10 x 1 x 2 + x 3 = 2 4x 1 + 2x 2 = 16 can be represented, by just listing the constants in the system, but the location has to be kept in mind. The augmented matrix representing this linear system is In general: An arbitrary system of m linear equations in n unknowns can be written as a 11 x 1 + a 12 x a 1n x n = b 1 a 21 x 1 + a 22 x a 2n x n = b a m1 x 1 + a m2 x a mn x n = b m where x 1, x 2,..., x n are the unknowns, and the a s and b s denote the constants. The indexes on the coefficients are specifying the location in the system. The first index indicates the equation, and the second index gives the unknown the coefficient multiplies. a 53 is the multiplier for variable x 3 in equation 5. Definition 4 (1) 1. A matrix is a rectangular array of numbers. 2. The augmented matrix for the linear system (6) is a 11 a a 1n b 1 a 21 a a 2n b a m1 a m2... a mn b m (2) The first task is to learn, how to solve linear equations. You will learn an algorithm to do so. This is very essential to be mastered to succeed in this course. We will use the algorithm over and over for solving different types of problems. Systems of linear equations are solved by manipulating the system through operations, that do not change the solution, but make finding the solution easier. Elementary row operations: 3

5 7. Add -6/5 times the third equation to the second 7. -6/5(3rd row)+ (2nd row) x 1 x 2 = x 2 = 10/ x 3 = Add 1 times the second equation to the first 8. (2nd row)+ (1st row) x 1 = x 2 = x 3 = Now it is obvious that the solution is x 1 = 3, x 2 = 2, x 3 = 1. This system has exactly one solution. Example 5 1. Assume you have one equation in 3 variables 3x + 3y 3z = 9 What are the solutions of this equation? Since we have only one equation, but three variables, we can choose freely (3-1) variables. Let s, t R, then y = s, z = t, 3x + 3s 3t = 9 y = s, z = t, x = (9 3s + 3t)/3 = 3 s + t is a solution for the equation. E.g. choose y = 1, z = 1, then with x = = is one possible solution. 2. x 1 2x 2 = 5 2x 1 + 4x 2 = 10 Use the augmented matrix to solve this linear system [ [ (1st row)+(2nd row) The last row translates to 0 = 0, which is always true, and gives no restriction on the unknowns solving the system. This line can be ignored when determining the solution. (2 variables - 1 equation) For s R, x 2 = s, x 1 = 5 + 2s is a solution of the linear system above. The system has infinite many solutions. 3. x 1 2x 2 = 5 2x 1 + 4x 2 = 5 Use the augmented matrix to solve this linear system [ [ (1st row)+(2nd row) The last row translates to 0 = 15, which is not true. No choice of the variables will lead to a solution of the linear system. This system has no solution. 5

6 1.2 Gaussian Elimination Definition 5 1. A matrix is in row-echelon form, if and only if (a) The leading coefficient of each nonzero row is one. (leading 1) (b) All rows consisting entirely of zeros are grouped at the bottom of the matrix. (c) The leading nonzero coefficient of a row is always strictly to the right of the leading coefficient of the row above it. 2. A matrix is in reduced row-echelon form, if and only if the matrix is in row-echelon form, and (d) each column that contains a leading 1 has zero everywhere else in that column. Theorem 1 Every matrix in reduced row-echelon form is also in row-echelon form. Proof: Assume A is any matrix in reduced row-echelon form. Therefore properties (a)-(d) from Definition 5 hold for A. Therefore particularly properties (a)-(c) hold for A. Therefore according to the definition A is in row-echelon form. End of proof. (Use therefore = ) Gaussian Elimination is an algorithm to transform a matrix into a equivalent matrix in row-echelon form. Gauss-Jordan elimination is an algorithm to transform a matrix into a equivalent matrix in reduced row-echelon form. Example 6 1. Gives solution x 1 = 5, x 2 = 2, x 3 = [ x 1 and x 2 correspond to leading 1s in the matrix, they are called pivots or leading variables. The nonleading variables are called free, here x 3. Free variables can be assigned arbitrary value from R, say s. Then the leading variables can be solved in s. This gives solutions x 1 = 5, x 2 = 2 2s, x 3 = s, for any s R. 6

7 The last equation translates to 0x 3 = 10, so 0 = 10. This can not be satisfied, the linear system has no solution. Gaussian Elimination step 1 Locate the leftmost column that is not entirely 0. step 2 Exchange the top row with another row, if necessary, to bring a non zero entry to the top of the column from step 1. step 3 If the entry is not one, say it is a, then multiply the row by 1/a. step 4 Add suitable multiples of the top row to the rows bellow so that all entries below the leading one become zeros. step 5 Now start over with step 1 for the matrix excluding row 1. The matrix is now in row echelon form Gauss-Jordan Elimination Step 1 to Step 5, and step 6 Beginning with the last nonzero row and working upward, add suitable multiples of each row to the rows above to introduce zeros above the leading 1s. After step 6 the matrix is in reduced row-echelon form. Example 7 Consider a linear system with the following augmented matrix step 1 First column step step 3 the entry is 1 7

10 Most important to observe, there have to be free variables, which can be set to arbitrary numbers in R, and each choice results in a different solution, so that there are must be infinite many different solutions. Solutions of homogeneous linear systems, can also be found using Gaussian or Gauss-Jordan Elimination Example 8 The augmented matrix of a homogeneous linear system is (r1)+r2, 3(r1)+r /6(r2) (r2)+r (backward substitution) The third row only yields 0 = 0, from the second row we get x 2 = x 3, from the first row, we then get x 1 + 2x 3 3x 3 = 0 x 1 = x 3. For any s R let x 3 = s (free variable), then x 1 = x 2 = x 3 = s is a solution of the linear system. With s = 0, we get the trivial solution. 10

11 1.3 Matrices and Matrix Operations In Definition 4, we gave the definition of a matrix to be a rectangular array of numbers. Definition 8 1. The numbers in the matrix are called the entries in the matrix. 2. A matrix with m rows and n columns is called an m n matrix. 3. A matrix with only one column (m 1 matrix) is called a column matrix or column vector. 4. A matrix with only one row (1 n matrix) is called a row matrix or row vector. Denotation Capital letters are used to denote matrices, and lower case letters are used to indicate numerical quantities (scalars). The entry in row i and column j of a matrix A is denoted by a ij or (A) ij. A general m n matrix can be written as a 11 a a 1n a 21 a a 2n... a m1 a m2... a mn (3) When compactness of notation is desired, the preceding matrix can be written as [a ij m n or [a ij. Denote vectors by lowercase boldface letters a being a 1 n (row) vector, and b being a m 1 column vector can be written as b 1 b 2 a = [a 1, a 2,..., a n, b =. b m Example 9 A = a = [2, 4, 3 is a 1 3 vector, with a 2 = 4. is a 3 4 matrix. a 23 = (A) 23 = 2 and a 32 = (A) 32 = 4 11

12 Definition 9 An n n matrix A is called a square matrix of order n. a 11 a a 1n a 21 a a 2n... a n1 a n2... a nn (4) The entries a 11, a 22,... a nn define the main diagonal of A. Definition 10 If A = [a ij and B = [b ij have the same size, then A = B a ij = b ij for all i and j. This definition says, that for two matrices to be equal they have to be of the same size, AND all entries have to be equal. Example 10 Let Then A = B s = 5, A C, because a 21 c 21 B = C s = 4, t = 2 A = [ [ 3 1, B = s 2 [ 3 1, C = 4 t Definition 11 If A = [a ij and B = [b ij have the same size, then the sum of A and B, A + B, is defined by (A + B) ij = (A) ij + (B) ij = a ij + b ij ij and the difference of A and B, A B, is defined through (A B) ij = (A) ij (B) ij = a ij b ij ij This definition says, that matrices of the same size are added and subtracted by adding and subtracting the corresponding entries, respectively. Example 11 Let Then A = [ A + B = [ 2 1, B = 1 4 [ , C = [ 5 2, A B = t 5 2 C can neither be added to nor subtracted from A and B because the sizes are not equal. 12

13 Theorem 4 Let A, B, C be matrices of the same size. (a) A + B = B + A (commutative law for addition) (b) A + (B + C) = (A + B) + C (associative law for addition) Proof: (a) Since the size of the sum of two matrices is equal to the size of the matrices being added, the matrices on the right and left are of the same size. We will now show that all entries of the two matrices are the same, then according to Definition 10, the matrices are equal. For all choices of i, j (b) DIY (A + B) ij Def.11 = (A) ij + (B) ij = (B) ij + (A) ij Def.11 = (B + A) ij Definition 12 If A = [a ij and c R, then the product of A and c, ca, is defined by (ca) ij = c(a) ij = ca ij ij Example 12 Let c = 1 and then A = [ [ 3 1 ca = 5 2 Theorem 5 Let a, b R, and B, C matrices of the same size, then (a) (a + b)c = ac + bc (b) (a b)c = ac bc (c) a(bc) = (ab)c (d) a(b + C) = ab + ac (e) a(b C) = ab ac Proof: 13

14 (a) Since multiplication with a scalar and adding two matrices has no effect on the size of the matrix, the matrices on the right and left have the same size. We will next show that all entries of the two matrices are the same, then according to Definition 10, the matrices are equal. For any i, j ((a + b)c) ij Def.12 = (a + b)(c) ij = a(c) ij + b(c) ij Def.12 = (ac) ij + (bc) i j Def.11 = (ac + bc) i j (c) Since multiplication with a scalar has no effect on the size of a matrix, the matrices on the right and left have the same size. Now show that all entries are the same. For any i, j (a(bc)) ij Def.12 = a(bc) ij Def.12 = (ab)(c) ij Def.12 = ((ab)c) ij Try the other proofs. Definition 13 Let A 1, A 2,..., A n be matrices of the same size, and c 1, c 2,..., c n R, then an expression of the form c 1 A 1 + c 2 A c n A n is called a linear combination in A 1, A 2,..., A n with coefficients c 1, c 2,..., c n. Example 13 Let then A = [ A 3B C = [ [ 2 1, B = [ [ 4 4, C = is a linear combination in A, B, C with coefficients 2, 3, 1/2. [ = [ Definition 14 If A = [a ij is an m r matrix and B = [b ij is an r n matrix, then the product of A and B, AB, is a m n matrix and, is defined through (AB) ij = r a ik b kj k=1 i, j Example 14 14

15 Let A = [ , B = A is a 2 3 matrix and B is a 3 3 matrix. Since the number of columns of A= number of rows of B, the product is defined and a 2 3 matrix [ AB = st row of A, 1st column of B: (AB) 11 = 3(2) + 1( 1) + 2(3) = 1 2nd row of A, 1st column of B: (AB) 21 = 5(2) + 2( 1) + 1(3) = 11 1st row of A, 2nd column of B: (AB) 12 = 3( 1) + 1(4) + 2( 2) = 3 2nd row of A, 2nd column of B: (AB) 22 = 5( 1) + 2(4) + 1( 2) = 1 1st row of A, 3rd column of B: (AB) 13 = 3(3) + 1( 1) + 2(1) = 8 2nd row of A, 3rd column of B: (AB) 23 = 5(3) + 2( 1) + 1(1) = 14 One special case is the multiplication of a row vector a 1 n with a column vector b n 1, by definition ab is a 1 1 matrix, i.e. a scalar. ab = n a i b i This will be later defined to be the dot-product of two vectors. We can partition matrices and conceive them as a an array of row or column vectors. If A is a m r and B is a r n matrix, then A = a 11 a a 1r a 21 a a 2r... a m1 a m2... a mr = a 1 a 2. a m i=1, B = b 11 b b 1n b 21 b b 2n... b r1 b r2... b rn = [ b 1 b 2... b n Then the ij entry of the product of A and B is the product of row vector i with column vector j: (AB) ij = a i b j Or one could partition the product matrix and observe, that AB = [ Ab 1 Ab 2... Ab n = a 1 B a 2 B. a m B 15

16 If A = [a 1 a 2 a n is a m n matrix and x is a column vector of length n, then Ax = x 1 a 1 + x 2 a x n a n is a linear combination of the vectors making up A, or a 11 x 1 + a 12 x a 1n x n a 21 x 1 + a 22 x a 2n x n Ax =. a m1 x 1 + a m2 x a mn x n Therefore a linear system in variables x 1,..., x n can be written in matrix form as Ax = b, where A is the coefficient matrix. Theorem 6 Assuming that the sizes of the matrices A, B, C are such that the indicated operations are defined and a R, then (a) A(BC) = (AB)C (associative law for multiplication) (b) A(B + C) = AB + AC (left distribution law) (c) (A + B)C = AC + BC (right distribution law) (d) A(B C) = AB AC (e) (A B)C = AC BC (f) a(bc) = (ab)c = B(aC) Proof: I will only show how to proof one of the properties. (b)a(b + C) = AB + AC To show this property, we need to prove according to Definition 10 that the matrices have the same size and all corresponding entries for the two matrices on the right and left are the same. In order to add two matrices, they have to have the same size. Let B, C be r n matrices, therefore B +C according to Definition 11 is a r n matrix. For the products A(B +C), AB, AC to be defined assume A is a m r matrix, then A(B + C), AB, AC are all m n matrices, therefore AB + AC is a m n matrix, therefore the sizes of the two matrices are equal. We found that the matrices on the right and the left have the same size. Now we will prove that the corresponding entries are equal. Choose any ij then (A(B + C)) ij Def.14 = Def.11 = = = r (A) ik (B + C) kj k=1 r (A) ik ((B) kj + (C) kj ) k=1 r ((A) ik (B) kj + (A) ik (C) kj ) k=1 r ((A) ik (B) kj + k=1 r (A) ik (C) kj ) k=1 16 Distributive law for scalars Algebra

17 Def.14 = (AB) ij + (AC) ij Def.11 = (AB + AC) ij This proves that every entry in matrix A(B +C) equals the corresponding entry in matrix AB +AC, which finalizes the proof. Definition 15 If A is a m n matrix, then the transpose of A, A T, is a n m matrix with (A T ) ij = (A) ij Transposing a matrix results in a matrix where rows and columns are exchanged. Example 15 A = [ , then A T = A = [ then A T = Theorem 7 If the sizes of the matrices are such that the stated operations can be performed then (a) (A T ) T = A (b) (A + B) T = A T + B T and (A B) T = A T B T (c) For k R: (ka) T = ka T (d) (AB) T = B T A T Proof: (a) Let A be a square matrix of size n, then A T is a square matrix of size n, therefore (A T ) T is a square matrix of size n. Therefore the matrices on the left and right have the same size. Now we will prove that all entries are the same. For any i, j ((A T ) T ) ij = (A T ) ji = (A) ij Therefore the entries are all the same and the equation holds. 17

18 (b) (first part) Let A, B square matrices of size n, then A + B is a square matrix of size n, therefore A T, B T, (A + B) T are square matrices of size n, and also A T + B T is a square matrix of size n. The size of the matrices on the right and left are equal, prove now that all entries are equal. For any i, j ((A + B) T ) ij Def.15 = (A + B) ji Def.11 = (A) ji + (B) ji Def.15 = (A T ) ij + (B T ) ij Def.11 = (A T + B T ) ij Therefore the entries are all the same and the equation holds. Definition 16 If A is a square matrix of size n, then the trace of A, tr(a), is defined by tr(a) = a 11 + a a nn = n i=1 a ii The trace of a square matrix is the total of the entries on the main diagonal Example 16 A = , then tr(a) = ( 2) = 4 theorem trace? 18

19 1.4 Inverses Definition 17 The zero matrix, 0, of size m n is the matrix with (0) ij = 0 for all index combinations ij. Theorem 8 Assuming that the sizes of the matrices are such that the indicated operations are defined, the following equalities hold (a) A + 0 = 0 + A = A (b) A A = 0 (c) 0 A = A (d) A0 = 0, 0A = 0 Proof: only for part (d) first part Let A be a m r matrix and O r n be a r n matrix then according to Definition 14 A0 is a m n matrix. Now show that the entries of this matrix are all zero. For any ij r r r (A0 r n ) ij = a ik 0 kj = a i k0 = 0 = 0 All entries of A0 are 0, therefore A0 = 0. k=1 Definition 18 The identity matrix of size n, I n, is a n n matrix with all entries 0, beside the entries on the main diagonal being 1. k=1 k=1 Example 17 I 3 = , I n = Theorem 9 For all matrices A of size m n (a) AI n = A (b) I m A = A Proof: only part (a) If A is a m n matrix then AI n is defined and a m n matrix, therefore the sizes of the matrices on the right and left are equal. 19

20 Now prove that the entries are all the same. For any ij n (AI n ) ij = a ik 0 + a ij 1 = a ij = (A) ij k=1 a ik (I n )kj = k j Since the size of the matrices are the same and the entries are all equal, the matrices are equal, therefore the equation holds. Theorem 10 If R is the reduced row echelon form of an n n matrix A, then either R has a row of zeros or R = I n. Proof: (text book pg 42) (not in class) Definition 19 If A is a square matrix, and if a matrix B of the same size exists such that AB = BA = I n then A is said to be invertible and B is called an inverse of A. If no such matrix exists, then A is said to be singular. Example 18 A = [ B = [ B is the inverse of A. To show that this is true we need to confirm the properties of the inverse matrix. and The matrix AB = BA = [ [ [ [ A = [ = = [ [ = I 2 = I 2 is singular (i.e. has no inverse). Let B be any matrix of size 2 2 [ b11 b B = 12 b 21 b 22 Then [ b11 b BA = 12 b 21 b 22 [ = [ b11 + 2b 21 0 b b 22 0 I 2 because the entry in row 2 column 2 is always 0, which should be 1 for the matrix to be the identity. 20

21 Theorem 11 If matrices B and C are inverses of A, then B = C. (The inverse of an invertible matrix is unique). Proof: Assume that B and C are inverses of A, then BA = I multiply both sides with C from the right (BA)C = C associativity of multiplication B(AC) = C AC = I(C is an inverse of A) BI = C B = C From the assumptions we conclude that B = C, which concludes the proof. Denotation Because the inverse is unique, we will denote the inverse of matrix A by A 1. Theorem 12 If A and B are invertible matrices of the same size, then AB is invertible and (AB) 1 = B 1 A 1 Proof: Let A and B be invertible matrices of the same size, then and (AB)(B 1 A 1 ) = A(BB 1 )A 1 = AIA 1 = I (B 1 A 1 )(AB) = B 1 (A 1 A)B = B 1 B = I We found that the matrix B 1 A 1 has all properties of an inverse. Since the inverse is unique, it must be the inverse and AB must be invertible. Theorem 13 A product of a finite number of invertible matrices is invertible, and the inverse of the product is the product of he inverses in reverse order. Proof by induction not here. Theorem 14 The matrix [ a b A = c d is invertible if and only if (ad bc) 0, and in this case the inverse of A is given by [ A 1 1 d b = ad bc c a Proof: DIY 21

22 Definition 20 If A is a square matrix, then for n N A 0 = I and A n = AA A }{{} n factors and if A is invertible A n = A 1 A 1 A 1 }{{} n factors Theorem 15 If A is a square matrix and r, s N, then Theorem 16 If A is an invertible matrix, then (a) A 1 is invertible and (A 1 ) 1 = A A r A s = A r+s and(a r ) s = A rs (b) For all n N, A n is invertible and (A n ) 1 = (A 1 ) n (c) For all k R, k 0, ka is invertible and (ka) 1 = 1/kA 1 Proof: only part (a), try (b) and (c) by yourself. Since A 1 A = I n and AA 1 = I n, we found a matrix B(= A), so that A 1 B = I and BA 1 = I, then according to Definition 19 A 1 is invertible and A is the inverse. Theorem 17 If A is an invertible matrix, then A T is invertible and (A T ) 1 = (A 1 ) T Proof: Observe that A T (A 1 ) T = A 1 A = I) and (A 1 ) T A T = AA 1 = I), i.e. we found a matrix of the same size as A T with A T B = BA T = I, so A T is invertible with (A T ) 1 = A 1 T. 22

.5 Elementary Matrices and a Method for Finding the Inverse Definition A n n matrix is called an elementary matrix if it can be obtained from I n by performing a single elementary row operation Reminder:

MATRIX ALGEBRA AND SYSTEMS OF EQUATIONS 1. SYSTEMS OF EQUATIONS AND MATRICES 1.1. Representation of a linear system. The general system of m equations in n unknowns can be written a 11 x 1 + a 12 x 2 +

1 Introduction to Matrices In this section, important definitions and results from matrix algebra that are useful in regression analysis are introduced. While all statements below regarding the columns

1. LINEAR EQUATIONS A linear equation in n unknowns x 1, x 2,, x n is an equation of the form a 1 x 1 + a 2 x 2 + + a n x n = b, where a 1, a 2,..., a n, b are given real numbers. For example, with x and

Chapter 1 LINEAR EQUATIONS 1.1 Introduction to linear equations A linear equation in n unknowns x 1, x,, x n is an equation of the form a 1 x 1 + a x + + a n x n = b, where a 1, a,..., a n, b are given

1 P a g e Mathematics Notes for Class 12 chapter 3. Matrices A matrix is a rectangular arrangement of numbers (real or complex) which may be represented as matrix is enclosed by [ ] or ( ) or Compact form

LECTURE 5 Solving Systems of Linear Equations Recall that we introduced the notion of matrices as a way of standardizing the expression of systems of linear equations In today s lecture I shall show how

Topic 1: Matrices and Systems of Linear Equations Let us start with a review of some linear algebra concepts we have already learned, such as matrices, determinants, etc Also, we shall review the method

Matrices define matrix We will use matrices to help us solve systems of equations. A matrix is a rectangular array of numbers enclosed in parentheses or brackets. In linear algebra, matrices are important

Chapter MATRICES Matrix arithmetic A matrix over a field F is a rectangular array of elements from F The symbol M m n (F) denotes the collection of all m n matrices over F Matrices will usually be denoted

NON SINGULAR MATRICES DEFINITION. (Non singular matrix) An n n A is called non singular or invertible if there exists an n n matrix B such that AB = I n = BA. Any matrix B with the above property is called

4. MATRICES 170 4. Matrices 4.1. Definitions. Definition 4.1.1. A matrix is a rectangular array of numbers. A matrix with m rows and n columns is said to have dimension m n and may be represented as follows:

Lecture 6 Inverse of Matrix Recall that any linear system can be written as a matrix equation In one dimension case, ie, A is 1 1, then can be easily solved as A x b Ax b x b A 1 A b A 1 b provided that

Appendix A Introduction to Matrix Algebra I Today we will begin the course with a discussion of matrix algebra. Why are we studying this? We will use matrix algebra to derive the linear regression model

Chapter 1 - Matrices & Determinants Arthur Cayley (August 16, 1821 - January 26, 1895) was a British Mathematician and Founder of the Modern British School of Pure Mathematics. As a child, Cayley enjoyed

September 4 Goals Define inverse of a matrix. Point out that not every matrix A has an inverse. Discuss uniqueness of inverse of a matrix A. Discuss methods of computing inverses, particularly by row operations.

.: MATRIX OPERATIONS What are diagonal entries and the main diagonal of a matrix? What is a diagonal matrix? When are matrices equal? Scalar Multiplication 45 Matrix Addition Theorem (pg 0) Let A, B, and

These notes closely follow the presentation of the material given in David C Lay s textbook Linear Algebra and its Applications (3rd edition) These notes are intended primarily for in-class presentation

Math 1 Lecture #10 2.2: The Inverse of a Matrix Matrix algebra provides tools for creating many useful formulas just like real number algebra does. For example, a real number a is invertible if there is

1.. SOLVING A SYSTEM OF LINEAR EQUATIONS 1. Solving a System of Linear Equations 1..1 Simple Systems - Basic De nitions As noticed above, the general form of a linear system of m equations in n variables

MATH 23: SYSTEMS OF LINEAR EQUATIONS Systems of Linear Equations In the plane R 2 the general form of the equation of a line is ax + by = c and that the general equation of a plane in R 3 will be we call

Lecture 10: Invertible matrices. Finding the inverse of a matrix Danny W. Crytser April 11, 2014 Today s lecture Today we will Today s lecture Today we will 1 Single out a class of especially nice matrices

Determinants Dr. Doreen De Leon Math 52, Fall 205 Determinant of a Matrix Elementary Matrices We will first discuss matrices that can be used to produce an elementary row operation on a given matrix A.

, Continued and The of a Matrix Calculus III Summer 2013, Session II Monday, July 15, 2013 Agenda 1. The rank of a matrix 2. The inverse of a square matrix Gaussian Gaussian solves a linear system by reducing

Chapter 8 Matrices II: inverses We have learnt how to add subtract and multiply matrices but we have not defined division. The reason is that in general it cannot always be defined. In this chapter, we

1 Linear Equations in Linear Algebra 1.2 Row Reduction and Echelon Forms ECHELON FORM A rectangular matrix is in echelon form (or row echelon form) if it has the following three properties: 1. All nonzero

Appendix A The Solution of Linear Simultaneous Equations Circuit analysis frequently involves the solution of linear simultaneous equations. Our purpose here is to review the use of determinants to solve

These notes closely follow the presentation of the material given in David C Lay s textbook Linear Algebra and its Applications (3rd edition) These notes are intended primarily for in-class presentation

A FIRST COURSE IN LINEAR ALGEBRA An Open Text by Ken Kuttler Systems of Linear Equations Lecture Notes by Karen Seyffarth Adapted by LYRYX SERVICE COURSE SOLUTION Attribution-NonCommercial-ShareAlike (CC

2.2 The Inverse of a Matrix Math 2331 Linear Algebra 2.2 The Inverse of a Matrix Jiwen He Department of Mathematics, University of Houston jiwenhe@math.uh.edu math.uh.edu/ jiwenhe/math2331 Jiwen He, University

SYSTEMS OF EQUATIONS AND MATRICES WITH THE TI-89 by Joseph Collison Copyright 2000 by Joseph Collison All rights reserved Reproduction or translation of any part of this work beyond that permitted by Sections

Matrix algebra January 20 Introduction Basics The mathematics of multiple regression revolves around ordering and keeping track of large arrays of numbers and solving systems of equations The mathematical

September 21, 2014 Matrices A matrix A m n is an array of numbers in rows and columns a 11 a 12 a 1n r 1 a 21 a 22 a 2n r 2....... a m1 a m2 a mn r m c 1 c 2 c n We say that the dimension of A is m n (we

MathQuest: Linear Algebra Matrix Inverses 1. Which of the following matrices does not have an inverse? 1 2 (a) 3 4 2 2 (b) 4 4 1 (c) 3 4 (d) 2 (e) More than one of the above do not have inverses. (f) All

School of Economics, Management and Statistics University of Bologna Academic Year 205/6 NOTES on LINEAR ALGEBRA for the students of Stats and Maths This is a modified version of the notes by Prof Laura

L1-2. Special Matrix Operations: Permutations, Transpose, Inverse, Augmentation 12 Aug 2014 Unfortunately, no one can be told what the Matrix is. You have to see it for yourself. -- Morpheus Primary concepts:

Solving Systems of Linear Equations There are two basic methods we will use to solve systems of linear equations: Substitution Elimination We will describe each for a system of two equations in two unknowns,

1 VECTOR SPACES AND SUBSPACES What is a vector? Many are familiar with the concept of a vector as: Something which has magnitude and direction. an ordered pair or triple. a description for quantities such

Linear Algebra Notes for Marsden and Tromba Vector Calculus n-dimensional Euclidean Space and Matrices Definition of n space As was learned in Math b, a point in Euclidean three space can be thought of

Numerical Analysis Lecture Notes Peter J. Olver 4. Gaussian Elimination In this part, our focus will be on the most basic method for solving linear algebraic systems, known as Gaussian Elimination in honor

Math 31 Homework 1 Solutions Last modified: July 15, 01 This homework is due on Thursday, July 1th, 01 at 1:10pm Please turn it in during class, or in my mailbox in the main math office (next to 4W1) Please

LECTURE I. Inverse matrices We return now to the problem of solving linear equations. Recall that we are trying to find such that A = y. Recall: there is a matri I such that for all R n. It follows that

MAT 171 8.5 Solving Linear Systems Using Matrices and Row Operations A. Introduction to Matrices Identifying the Size and Entries of a Matrix B. The Augmented Matrix of a System of Equations Forming Augmented

Section 4.1: Systems of Equations Systems of equations A system of equations consists of two or more equations involving two or more variables { ax + by = c dx + ey = f A solution of such a system is an

Lecture notes on linear algebra David Lerner Department of Mathematics University of Kansas These are notes of a course given in Fall, 2007 and 2008 to the Honors sections of our elementary linear algebra

Harvey Mudd College Math Tutorial: Solving Systems of Linear Equations; Row Reduction Systems of linear equations arise in all sorts of applications in many different fields of study The method reviewed

ENGG2012B Advanced Engineering Mathematics Notes on Determinant Lecturer: Kenneth Shum Lecture 9-18/02/2013 The determinant of a system of linear equations determines whether the solution is unique, without

Math 15 Sec S0601/S060 4 Solving Systems of Equations by Reducing Matrices 4.1 Introduction One of the main applications of matrix methods is the solution of systems of linear equations. Consider for example

Section 1.2: Row Reduction and Echelon Forms Echelon form (or row echelon form): 1. All nonzero rows are above any rows of all zeros. 2. Each leading entry (i.e. left most nonzero entry) of a row is in

MathsTrack (NOTE Feb 2013: This is the old version of MathsTrack. New books will be created during 2013 and 2014) Topic 4 Module 9 Introduction Systems of to Matrices Linear Equations Income = Tickets!

SYSTEMS OF EQUATIONS 1. Examples of systems of equations Here are some examples of systems of equations. Each system has a number of equations and a number (not necessarily the same) of variables for which

Helpsheet Giblin Eunson Library ATRIX ALGEBRA Use this sheet to help you: Understand the basic concepts and definitions of matrix algebra Express a set of linear equations in matrix notation Evaluate determinants

MATH 37 Linear Transformations from Rn to Rm Dr. Neal, WKU Let T : R n R m be a function which maps vectors from R n to R m. Then T is called a linear transformation if the following two properties are